If two segments are parallel, the lines containing them are coplanar?
True or false
Back you answer up
2006-07-18 22:33:19 · 4 answers · asked by Zman 1 in Science & Mathematics ➔ Mathematics
I did not clearly understand the question I can help you if you make it clear a bit.
Thank you.
2006-07-18 23:36:58 · answer #1 · answered by Sherlock Holmes 6 · 0⤊ 3⤋
Considering "segments" that are rectangular for instance,one lying on top of the other,their "lines" (top,bottom.left,right,) and center line would be "coplanar".That is to say,on the same plane,or said another way sharing the same plane.
2006-07-18 22:47:51 · answer #2 · answered by ? 6 · 0⤊ 0⤋
Co-planar skill all strains lie interior a similar 2-dimensional airplane. one way of checking if strains are co-planar may be to bypass around the shape till you're searching at each of the strains endways, alongside their uncomplicated airplane, in which case you may see no longer some thing yet a one-dimensional immediately line because each of the strains are lined up in the front of or in the back of one different. Parallel segments may nicely be co-planar in the adventure that they lie interior a similar 2-D airplane. yet they're typically parallel without being inevitably co-planar: the segments may be parallel yet one inch aside, so each section may occupy diverse 2-D planes, and in case you regarded at them endways you may see 2 immediately strains (each representing a diverse airplane) one inch aside.
2016-10-14 23:02:44 · answer #3 · answered by ? 4 · 0⤊ 0⤋
Well, duh. Connect the endpoints of the segments.
Owned.
2006-07-18 22:45:35 · answer #4 · answered by Coffee-Infused Insomniac 3 · 0⤊ 0⤋